What is a distributive expression?

What is a distributive expression?

Using the Distributive Property with Expressions The distributive property states that if a factor is multiplied by the sum of two numbers, you can multiply each of the two numbers by that factor and then add them to produce the same result.

What is an example of a distributive equation?

It is used to solve expressions easily by distributing a number to the numbers given in brackets. For example, if we apply the distributive property of multiplication to solve the expression: 4(2 + 4), we would solve it in the following way: 4(2 + 4) = (4 × 2) + (4 × 4) = 8 + 16 = 24.

What is distributive law in algebraic expression?

distributive law, in mathematics, the law relating the operations of multiplication and addition, stated symbolically, a(b + c) = ab + ac; that is, the monomial factor a is distributed, or separately applied, to each term of the binomial factor b + c, resulting in the product ab + ac.

What is the distributive of 25?

25 × 2 = (20 + 5) × 2. Try again. This is an example of the distributive property. 25 × 2 is not equal to 20 + (5 × 2)….Click Go On to begin.

A × (B + C) = (A × B) + (A × C)
27 = 27

What are 2 examples of distributive property?

The distributive property of multiplication over addition can be used when you multiply a number by a sum. For example, suppose you want to multiply 3 by the sum of 10 + 2. 3(10 + 2) =? According to this property, you can add the numbers and then multiply by 3.

What is the distributive property of 14 * 6?

Answer: 14 × 6 = 84.

How to simplify algebraic expressions with distributive property?

Remember the general definition of the distributive property, a (b+c) = ab + ac, and use this to simplify algebraic expressions. Here are a few examples. Consider this expression: {eq}8\\ (5n\\ +\\ 6) {/eq}.

How do you use the distributive property?

The distributive property can be used to simplify an algebraic expression, or it can be used as a first step toward solving an algebraic equation. No matter in what context it is used, the distributive property is useful to know and understand.

What happens when you simplify algebraic expressions?

It is also important to remember that when we simplify algebraic expressions, we are combining like terms. Like terms are terms of an expression which have the same variable raised to the same power. For example, and are like terms, and and are like terms as well.